2024 Matrix initial value problem calculator

S = dsolve(eqn) solves the differential equation eqn, where eqn is a symbolic equation. Use diff and == to represent differential equations. For example, diff(y,x) == y represents the equation dy/dx = y. Solve a system of differential equations by specifying eqn as a vector of those equations. example. S = dsolve(eqn,cond) solves eqn with the .... Joann fabrics corporate office human resources

Download Page (PDF) Download Full Book (PDF) Resources expand_more. Periodic Table. Physics Constants. Scientific Calculator. Reference expand_more. Reference & Cite. Tools expand_more.Free functions calculator - explore function domain, range, intercepts, extreme points and asymptotes step-by-stepTrucks are a great investment, but it can be difficult to know how much they’re worth. Whether you’re looking to buy or sell, it’s important to know the value of your truck so you ...An eigenvector calculator is an online tool to evaluate eigenvalues and eigenvectors for a given matrix. It finds eigenvectors by finding the eigenvalues. Eigenvector calculator with steps can evaluate the eigenvector corresponding to the eigenvalues. In mathematics and data science, the concept of eigenvectors is most …Equations Inequalities Scientific Calculator Scientific Notation Arithmetics Complex Numbers Polar/Cartesian Simultaneous Equations System of Inequalities Polynomials Rationales Functions Arithmetic & Comp. Coordinate Geometry Plane Geometry Solid Geometry Conic Sections TrigonometryThe general solution of a differential equation gives an overview of all possible solutions (by integrating c constants) presented in a general form that can encompass an infinite range of solutions.. The particular solution is a particular solution, obtained by setting the constants to particular values meeting the initial conditions defined by the user or by the context of …New individuals can also be born, and the birth rate, or fecundity describes the rate per capita of births arising from each age category. Given each of these parameters, we can model the evolution of a single time step with the equation. nt+1 = Lnt, where nt is a vector of the populations in each age class at time t and L is the Leslie Matrix.Free Matrix Eigenvalues calculator - calculate matrix eigenvalues step-by-stepFive steps to solve algebra equations, algebra distributive calculator, 10 examples of dividing integers, lesson plan on rules of exponents, end of algebra 1 test worksheets, Algebra help vertex form. Gencoe math, programming to solve a equation + java + example, ti-84 percentage sign.To solve the given initial value problem. To find the eigenvalues, Set up the f... View the full answer Step 2. Unlock. Step 3. Unlock. Step 4. Unlock.The Linear System Solver is a Linear Systems calculator of linear equations and a matrix calcularor for square matrices. It calculates eigenvalues and eigenvectors in ond obtaint …(New) All problem ... Home > Matrix & Vector calculators > Solving systems of linear equations using Gauss Seidel method calculator ... Initial gauss / Start value = ...This chapter covers ordinary differential equations with specified initial values, a subclass of differential equations problems called initial value problems. To reflect the importance of this class of problem, Python has a whole suite of functions to solve this kind of problem. By the end of this chapter, you should understand what ordinary ...Step 1. [Graphing Calculator] In Problems 17 through 34, use the method of variation of parameters (and perhaps a computer algebra system) to solve the initial value problem x′ =Ax+f (t), x(a)= xa In each problem we provide the matrix exponential eAt as provided by a computer algebra system.Ask Question. Asked 9 years, 2 months ago. Modified 9 years, 2 months ago. Viewed 385 times. -1. Given the initial value problem. x′′ + 4x = 0, x(0) = 1,x′(0) = 4 x ″ + 4 x = 0, x ( 0) = 1, x ′ ( 0) = 4. (a) Find the matrix A A for which [ x′ x′′] = A[ x x′] [ x ′ x ″] = A [ x x ′].ODE Boundary Value Problem Statement¶. In the previous chapter, we talked about ordinary differential equation initial value problems. We can see that in the initial value problems, all the known values are specified at the same value of the independent variable, usually at the lower boundary of the interval, thus this is where the term 'initial' comes from.Explore math with our beautiful, free online graphing calculator. Graph functions, plot points, visualize algebraic equations, add sliders, animate graphs, and more.Feb 16, 2023 ... The initial value problem calculator is a tool used to calculate differential equations. An instrument for solving ordinary differential ...x2(t0) = x1(t0 −t0) = x1(0) = x0, and, using the chain rule, the differential equation. dx2 dt (t) = dx1 dt (t −t0) = f(x1(t −t0)) = f(x2(t)). So the solution x2(t) is the same as the solution x1(t) with just a shift in time t. In general, the same statement is not true for nonautonomous equations. This difference between autonomous and ...Matrix Partners India is raising $450 million for its fourth India fund, doubling down on the South Asian market where scores of investors including Sequoia, Lightspeed, SoftBank, ...Here's the best way to solve it. The correct answer is , , Explanation- To find the eigenpairs of matrix and the vector such that the initial value problem , which has the solution curve displayed in the phase portrait in the image. We c …. Find the eigen pairs of matrix A and the vector Xo such that the initial value problem x' = Ax, x (0 ...As per the guidelines, answering one question. Rewrite the initial value problem y" + y" + y = t, y (0) = y' (0) = y" (0) = 0 as an equivalent first-order system. The matrix A = (a b 0 -b a 0 0 0 2) where a and b are real numbers, is diagonalizable, 1.e. there exists a matrix P such that P^-1 AP = D where D is diagonal. Compute D.Here's the best way to solve it. Doubt in this then c …. (1 point) Consider the initial value problem (a) Find the eigenvalues and eigenvectors for the coefficient matrix. 11 = (b) Solve the initial value problem. Give your solution in real form. X (t) = Use the phase plotter pplane9.m in MATLAB to answer the following question.How to solve a two-point boundary value problem differential equation by the shooting method.Join me on Coursera: https://imp.i384100.net/mathematics-for-eng...The shooting method by default starts with zero initial conditions so that if there is a zero solution, it will be returned. This computes a very simple solution to the boundary value problem with : In [1]:=. Out [2]=. By default, "Shooting" starts from the left side of the interval and shoots forward in time.Understand Linear Algebra, one step at a time. Step by steps for inverse matrices, determinants, and eigenvalues. Enter your math expression. x2 − 2x + 1 = 3x − 5. Get Chegg Math Solver. $9.95 per month (cancel anytime). See details. Linear Algebra problems we've solved. Equations Inequalities Scientific Calculator Scientific Notation Arithmetics Complex Numbers Polar/Cartesian Simultaneous Equations System of Inequalities Polynomials Rationales Functions Arithmetic & Comp. Coordinate Geometry Plane Geometry Solid Geometry Conic Sections Trigonometry Question: In Problems 17 through 34, use the method of variation of parameters (and perhaps a computer algebra system) to solve the initial value problem x′=Ax+f(t),x(a)=xa In each problem we provide the matrix exponential eAt as provided by a computer algebra system.17.Definitions – In this section some of the common definitions and concepts in a differential equations course are introduced including order, linear vs. nonlinear, initial conditions, initial value problem and interval of validity. Direction Fields – In this section we discuss direction fields and how to sketch them. We also investigate how direction …learn more: http://math.rareinfos.com/category/courses/solutions-differential-equations/How to solve a homogeous system posed as an initial-value problemLinear ProgrammingObjectives In this paper, we discuss a Maple package, deaSolve, of the symbolic algorithm for solving an initial value problem for the system of linear differential-algebraic equations with constant coefficients. Results Using the proposed Maple package, one can compute the desired Green's function of a given IVP. Sample computations are presented to illustrate the Maple package.The top 10 Indian VCs, such as Blume Ventures, Matrix Partners India and Chiratae Ventures, have participated in nearly 600 funding rounds and backed over 420 ventures in just the ...To solve an initial value problem for a second-order nonhomogeneous differential equation, we'll follow a very specific set of steps. We first find the complementary solution, then the particular solution, putting them together to find the general solution. Then we differentiate the general solution, plug the given initial conditions into the ...Question: Write the given second order equation as its equivalent system of first order equations. u′′+2u′+8u=0 Use v to represent the "velocity function", i.e. v=u′(t) Use v and u for the two functions, rather than u(t) and v(t) u′= v′= Now write the system using matrices: d/dt [ uEquations Inequalities Scientific Calculator Scientific Notation Arithmetics Complex Numbers Polar/Cartesian Simultaneous Equations System of Inequalities Polynomials Rationales Functions Arithmetic & Comp. Coordinate Geometry Plane Geometry Solid Geometry Conic Sections TrigonometryCalculator applies methods to solve: separable, homogeneous, first-order linear, Bernoulli, Riccati, exact, inexact, inhomogeneous, with constant coefficients, Cauchy–Euler and …Compute answers using Wolfram's breakthrough technology & knowledgebase, relied on by millions of students & professionals. For math, science, nutrition, history ...Section 5.7 : Real Eigenvalues. It's now time to start solving systems of differential equations. We've seen that solutions to the system, →x ′ = A→x x → ′ = A x →. will be of the form. →x = →η eλt x → = η → e λ t. where λ λ and →η η → are eigenvalues and eigenvectors of the matrix A A.Solving Initial Value Problems with a Computer Solver A Quick Recap Recall that when solving a differential equation alone we are typically led to a family ...Consider the Initial Value Problem. (a) Find the eigenvalues and eigenvectors for the coefficient matrix. (b) Solve the initial value problem. Give your solution in real form. Here's the best way to solve it. (1 point) Consider the Initial Value Problem: 3 x1 ' -321 +22 -1021 +3.02' 31 (0) 22 (0) = 7 (a) Find the eigenvalues and eigenvectors ...In this section we will learn how to solve linear homogeneous constant coefficient systems of ODEs by the eigenvalue method. Suppose we have such a system. x ′ = Px , x → ′ = P x →, where P P is a constant square matrix. We wish to adapt the method for the single constant coefficient equation by trying the function eλt e λ t.The problem of finding a function [Math Processing Error] y that satisfies a differential equation. [Math Processing Error] d y d x = f ( x) with the additional condition. [Math Processing Error] y ( x 0) = y 0. is an example of an initial-value problem. The condition [Math Processing Error] y ( x 0) = y 0 is known as an initial condition. INITIAL VALUE PROBLEMS the matrix is tridiagonal, like I tK in Example 2). We will comment later on iterations like Newton’s method or predictor-corrector in the nonlinear case. The rst example to study is the linear scalar equation u0 = au. Compare forward and backward Euler, for one step and for n steps: Repeat Problem 25, but with f(t) = 6 sint and x(0) in Problems 17 through 34, use the method of variation of pa- ameters (and perhaps a computer algebra system) to solve the initial value problem V2 = 1W, T = 10, co = 3 In Problems 17 through 34, use the method of variation of pa- rameters (and perhaps a computer algebra system) to solve the ...The Initial Value Problem and Eigenvectors - Ximera. laode. Textbook. Solving Ordinary Differential Equations. The Initial Value Problem and Eigenvectors. Martin Golubitsky and Michael Dellnitz. The general constant coefficient system of differential equations has the form. where the coefficients are constants.Solve the initial value problem for r as vector function of t Differential equation : d r d t = 6 ( t + 1 ) 1 / 2 i + 2 e - t j + 1 t + 1 k Initial condition: r ( 0 ) = k; Solve the initial value problem for {r} as a vector function of t .In this paper, a novel operational matrix method is introduced. This method is based on the frame of linear cardinal B-spline. We call this method as the frame operational matrix (FOM) method. First, we construct the operational matrix from the frame by using a collocation method. We develop the FOM method using this operational matrix. We apply this method to solve initial value problems both ...Martin Golubitsky and Michael Dellnitz. To summarize the ideas developed in this chapter, we review the method that we have developed to solve the system of differential equations. satisfying the initial conditions. Begin by rewriting (??) in matrix form. where Rewrite the initial conditions (??) in vector form where.Section 5.7 : Real Eigenvalues. It's now time to start solving systems of differential equations. We've seen that solutions to the system, →x ′ = A→x x → ′ = A x →. will be of the form. →x = →η eλt x → = η → e λ t. where λ λ and →η η → are eigenvalues and eigenvectors of the matrix A A.Matrix Calculator: A beautiful, free matrix calculator from Desmos.com.Each row in the solution array y corresponds to a value returned in column vector t. All MATLAB ® ODE solvers can solve systems of equations of the form y ' = f (t, y), or problems that involve a mass matrix, M (t, y) y ' = f (t, y). The solvers all use similar syntaxes. The ode23s solver only can solve problems with a mass matrix if the mass ...Use the method of Laplace transforms to solve: y ′ − 5 y = − e − 2 t, y ( 0) = 3. Step 1: First, we will take the Laplace transform of both sides of the differential equation: L { y ′ − 5 y } = L { − e − 2 t } Now we will use our operations and properties of Laplace transforms to transform the DE into an algebraic equation in ...Recall that X = Φ (t)Φ−1 (t0)X0 + Φ (t) t t0 Φ−1 (s)F (s) ds solves the initial value problem X' = AX + F (t), X (t0) = X0 whenever Φ (t) is a fundamental matrix of the associated homogeneous system. Use the above to solve the given initial-value problem. X' = 1 −1 1 −1 X + 1 t 1 t , X (1) = 4 −1. This question hasn't been solved ...Advanced Math questions and answers. Consider the initial value problem ddtx=Ax,x (0)= [002] where A= [244-1-20-102]The matrix A has one real and two complex eigenvalues λ=α+-βi. Enter the real and two complex eigenvalues in the following blank as a comma separated list:Let λ1 denote the real eigenvalue with eigenvector V1 and λ2 ...Desmos offers best-in-class calculators, digital math activities, and curriculum to help every student love math and love learning math.PROBLEM-SOLVING STRATEGY: METHOD OF UNDETERMINED COEFFICIENTS. Solve the complementary equation and write down the general solution. Based on the form of $r(x)$, make an initial guess for $y_p(x)$. Check whether any term in the guess for$y_p(x)$ is a solution to the complementary equation. If so, multiply the guess by $x.$Matrix differential equation. A differential equation is a mathematical equation for an unknown function of one or several variables that relates the values of the function itself and its derivatives of various orders. A matrix differential equation contains more than one function stacked into vector form with a matrix relating the functions to ...The limitations of Taylor's series include poor convergence for some functions, accuracy dependent on number of terms and proximity to expansion point, limited radius of convergence, inaccurate representation for non-linear and complex functions, and potential loss of efficiency with increasing terms.See Answer. Question: Find the eigenpairs of matrix A and the vector Xo such that the initial value problem x' = Ax, x= 22 has the solution curve displayed in the phase portrait below. 2. x (0)=xo, 12 21 22 2 11=1, V = - (1) ; 12 = -1, V2 = Xo = 11 =1, Vi = d = , ] 12 = -1, V2 [11] Xo = None of the options displayed. 11 =1, Vi= 12 = -1, V2 vz ...Compute answers using Wolfram's breakthrough technology & knowledgebase, relied on by millions of students & professionals. For math, science, nutrition, history ...Users enter a first-order ODE in the form dy/dx = f ( x, y ), or a system in the form dx/dt = f ( t, x, y) and dy/dt = g ( t, x, y ). (Note: A limited number of alternative variables can be chosen, to make it easier to adapt to different applications or textbook conventions.) For ODEs, a slope field is displayed; for systems, a direction field ...I want to solve an initial value problem, using matrices in matlab. I have an initial value problem that looks like this: and i have a solution vector for . I have used the commando [X, D] = eig (A) to get the eigenvectors and eigen values. I am thinking that I want to multiply X (matrix with eigenvalues) with an new vector (c1,c2,c3 which are ...In today’s digital age, the internet has revolutionized the way we approach various tasks. One area that has greatly benefited from this technological advancement is mathematics. O...About absolute value equations. Solve an absolute value equation using the following steps: Get the absolve value expression by itself. Set up two equations and solve them separately.Jul 14, 2022 · Matrix Solution of the Homogeneous Problem; Example 2.17. Let's consider the matrix initial value problem; There is a general theory for solving homogeneous, constant coefficient systems of first order differential equations. We begin by once again recalling the specific problem (2.12). We obtained the solution to this system as \[\begin{gathered} Fundamental Matrix & Initial Value Problem Consider an initial value problem x' = P(t)x, x(t 0) = x0 where α< t 0 < βand x0 is a given initial vector. Now the solution has the form x = ΨΨΨ(t)c, hence we choose c so as to satisfy x(t) = x0. 0 0 Recalling ΨΨΨ(t 0) is nonsingular, it follows that Thus our solution x = ΨΨΨ(t)c can be ...Interval of integration (t0, tf). The solver starts with t=t0 and integrates until it reaches t=tf. Both t0 and tf must be floats or values interpretable by the float conversion function. y0 array_like, shape (n,) Initial state. For problems in the complex domain, pass y0 with a complex data type (even if the initial value is purely real).Find the eigenpairs of matrix A and the vector x0 such that the initial value problem x′ =Ax, x(0)= x0, has the solution curve displayed in the phase portrait below. None of the options displayed. λ± =±3i, v± =[ 1 0]±[ 0 1]i, x0 =[ 1 1]. λ± =−3±2i, v± =[ 0 1]±[ 1 0]i, x0 =[ 1 0]. λ± =−3±2i, v± =[ 0 1]±[ 1 0]i, x0 =[ 0 −1 ...However, the solution to a certain class of system of simultaneous equations does always converge using the Gauss-Seidel method. This class of system of equations is where the coefficient matrix [A] in [A][X] = [C] is diagonally dominant, that is. |aii| ≥ n ∑ j = 1 j ≠ i |aij| for all i.For problems in a complex domain pass y with a complex data type (even if the initial guess is purely real). p array_like with shape (k,) or None, optional. Initial guess for the unknown parameters. If None (default), it is assumed that the problem doesn't depend on any parameters. S array_like with shape (n, n) or None. Matrix defining the ... $$$ y_1 $$$ is the function's new (approximated) value, the value at $$$ t=t_1 $$$. $$$ y_0 $$$ is the known initial value. $$$ f\left(t_0,y_0\right) $$$ represents the value of the derivative at the initial point. $$$ h $$$ is the step size or the increment in the t-value. Usage and Limitations. The Euler's Method is generally used when: Applications (11) This models the amount a n at year n when the interest r is paid on the principal p only: In [1]:=. Out [1]=. Here the interest is paid on the current amount a n, i.e. compound interest: In [2]:=. Out [2]=. Here a n denotes the number of moves required in the Tower of Hanoi problem with n disks: In [1]:=.7.2.2. Modified Euler method. This method is of a type that is called a predictor-corrector method. It is also the first of what are Runge-Kutta methods. As before, we want to solve (7.3). The idea is to average the value of \ (\dot {x}\) at the beginning and end of the time step.Algebra Calculator - get free step-by-step solutions for your algebra math problemsSince we have conjugate eigenvalues, we can write the eigenvector for the second eigenvalue as: v2 =(1 5(1 + 6–√), 1) v 2 = ( 1 5 ( 1 + 6), 1) You can now write: x(t) = c1 eλ1t v1 +c2 eλ2t v2 x ( t) = c 1 e λ 1 t v 1 + c 2 e λ 2 t v 2. Use the IC to find the constants. Your final solution should be: Share. Cite.An initial value problem (IVP) is a differential equations problem in which we’re asked to use some given initial condition, or set of conditions, in order to find the particular solution to the differential equation. Solving initial value problems. In order to solve an initial value problem for a first order differential equation, we’llQuestion: [Graphing Calculator] In Problems 17 through 34, use the method of variation of parameters (and perhaps a computer algebra system) to solve the initial value problem x′=Ax+f(t),x(a)=xa In each problem we provide the matrix exponential e∧′ as provided by a computer algebra system. 25.The first step in using the calculator is to indicate the variables that define the function that will be obtained after solving the differential equation. To do so, the two fields at the top of the calculator will be used. For example, if you want to solve the second-order differential equation y”+4y’+ycos (x)=0, you must select the ...Solve the initial value problem for r as vector function of t Differential equation : d r d t = 6 ( t + 1 ) 1 / 2 i + 2 e - t j + 1 t + 1 k Initial condition: r ( 0 ) = k; Solve the initial value problem for {r} as a vector function of t .Other Math questions and answers. In Problems 17 through 34, use the method of variation of pa- rameters (and perhaps a computer algebra system) to solve the initial value problem x' = Ax + f (t), X (a) = Xa. In each problem we provide the matrix exponential At as pro- vided by a computer algebra system. 6 - 7 60 A ,f (t) (0 -2 90 --+ + 7e5t 7e ...Nov 3, 2021 ... Familiarity with Matrix Algebra; Familiarity with Multi-Variable Taylor Series. Let's just once again be clear that we are dealing with ...Simplex Algorithm Calculator is an online application on the simplex algorithm and two phase method. Inputs Simply enter your linear programming problem as follows 1) Select if the problem is maximization or minimization 2) Enter the cost vector in the space provided, ie in boxes labeled with the Ci. Note that you can add dimensions to this vector with the menu "Add Column" or delete the ...One way to reduce the order of our second order differential equation is to formulate it as a system of first order ODEs, using: y1 =y˙0 y 1 = y ˙ 0. which gives us: {y˙0 = y1 y˙1 = μ(1 −y20)y1 −y0 { y ˙ 0 = y 1 y ˙ 1 = μ ( 1 − y 0 2) y 1 − y 0. Let's call the function for this system of ordinary differential equations vdp:Free separable differential equations calculator - solve separable differential equations step-by-stepYou'll get a detailed solution from a subject matter expert that helps you learn core concepts. Question: Solve the following initial value problems for the systems of equations using the matrix method. Findeigenvalues and eigenvectors by hand (but you can use technology to check your answers)I have eigen vectors/eigen values, and now I just ...This online calculator computes the eigenvalues of a square matrix by solving the characteristic equation. The characteristic equation is the equation obtained by equating the characteristic polynomial to zero. Thus, this calculator first gets the characteristic equation using the Characteristic polynomial calculator, then solves it ...As a result, Wolfram|Alpha also has separate algorithms to show algebraic operations step by step using classic techniques that are easy for humans to recognize and follow. This includes elimination, substitution, the quadratic formula, Cramer's rule and many more. Free Online Equation Calculator helps you to solve linear, quadratic and ...The initial-value problem (IVP), in which all of the conditions are given at a single value of the independent variable, is the simplest situation. Often the independent variable in this case represents time. Methods for IVPs usually start from the known initial value and iterate or “march” forward from there.

Solve a linear ordinary differential equation: y'' + y = 0. w" (x)+w' (x)+w (x)=0. Specify initial values: y'' + y = 0, y (0)=2, y' (0)=1. Solve an inhomogeneous equation: y'' (t) + y (t) = sin t. x^2 y''' - 2 y' = x. Solve an equation involving a parameter: y' (t) = a t y (t) Solve a nonlinear equation: f' (t) = f (t)^2 + 1.. Jason gillenwater paramedic

Question: Solve the following initial value problems by matrix methods. Apply techniques simplified from the format presented in the textbook and an additional handout. Specifically, use the following steps Step 1: Rewrite the initial value problem in matrix form. Specifically a) define the form of the solution vector X (t), b) define the ...Math. Calculus. Calculus questions and answers. Consider the following initial-value problem. X'= -1 -2 X + 2 3 4 2 X (0) = -2 6 Find the eigenvalues of the coefficient matrix A (t). (Enter your answers as a comma-separated list.) 2 = Find an eigenvector for the corresponding eigenvalues. (Enter your answers from smallest eigenvalue to largest ...Definition An n n matrix is non-negative,A 0, if all entries Aij 0.Similarly, positive matrices are defined. Exercise Assume that A is a non-negative matrix for which some power Ak is positive. Then all following powers are positive. Exercise Let k 4 and L be any Leslie matrix where not only fk is positive but also fi for some i k.It is easy to find the inverse of a matrix in MATLAB. Input the matrix, then use MATLAB’s built-in inv() command to get the inverse. Open MATLAB, and put the cursor in the console ...An initial value problem (IVP) is a differential equations problem in which we’re asked to use some given initial condition, or set of conditions, in order to find the particular solution to the differential equation. Solving initial value problems. In order to solve an initial value problem for a first order differential equation, we’llThe initial boundary value problem (1.2a)-(1.2c) has a unique solution provided some tech-nical conditions hold on the boundary conditions. One can think of the 'boundary' of the solution domain to have three sides: fx= ag;fx= bg and ft= 0g;with the last side left open (the solution lls this in as t!1). The initialFollow along with this advanced Matrix ITA guide to be sure you're using the software to the best of your ability. We may be compensated when you click on product links, such as cr...Desmos offers best-in-class calculators, digital math activities, and curriculum to help every student love math and love learning math.Click on “Solve”. The online software will adapt the entered values to the standard form of the simplex algorithm and create the first tableau. Depending on the sign of the constraints, the normal simplex algorithm or the two phase method is used. We can see step by step the iterations and tableaus of the simplex method calculator.Step 1. d d t X = A X, where A = [ 3 2 4 2 0 2 4 2 3] and X ( 0) = [ 1 1 3]. 5 points) 3 2 4 Consider the initial value problemX-AX, X (O)-1e 20 2 whereA 3 4 2 3 The matrix A has two distinct eigenvalues one of which is a repeated root. Enter the two distinct eigenvalues in the following blank as a comma separated list: Let A1-2 denote the ...Step 1. (1 point) Consider the initial value problem X ′ =[ 7 −1 1 5]X, X (0)= [ 3 −4] (a) Find the eigenvalue λ, an eigenvector X 1, and a generalized eigenvector X 2 for the coefficient matrix of this linear system. λ =[X 1 = [,X 2 =[ [ (b) Find the most general real-valued solution to the linear system of differential equations..

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